TY - JOUR
T1 - Numerical stability and accuracy of implicit integration of free surface groundwater equations
AU - Liu, Philip L.‐F
AU - Liggett, James A.
PY - 1980/10
Y1 - 1980/10
N2 - In the solution of two‐ or three‐dimensional free surface flow the time‐dependent boundary condition is represented in an implicit finite difference form. The numerical solution may damp or amplify the real solution or contain oscillations, either stable or unstable, about the real solution, depending on the weighting factor θ (which positions the space derivative in time) and the wave number of the solution mode. Zero numerical damping occurs at a value of 0.5 < θ < 0.6; the exact value of θ depends on the wave number and length of the time step. The paper provides a guide for choosing θ and the time step.
AB - In the solution of two‐ or three‐dimensional free surface flow the time‐dependent boundary condition is represented in an implicit finite difference form. The numerical solution may damp or amplify the real solution or contain oscillations, either stable or unstable, about the real solution, depending on the weighting factor θ (which positions the space derivative in time) and the wave number of the solution mode. Zero numerical damping occurs at a value of 0.5 < θ < 0.6; the exact value of θ depends on the wave number and length of the time step. The paper provides a guide for choosing θ and the time step.
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U2 - 10.1029/WR016i005p00897
DO - 10.1029/WR016i005p00897
M3 - Article
AN - SCOPUS:0019228340
SN - 0043-1397
VL - 16
SP - 897
EP - 900
JO - Water Resources Research
JF - Water Resources Research
IS - 5
ER -